David M. Bradley
Published 2005-05-07Version 1
We prove a remarkable formula of Ramanujan for the logarithmic derivative of the gamma function, which converges more rapidly than classical expansions, and which is stated without proof in Ramanujan's notebooks. The formula has a number of very interesting consequences which we derive, including an elegant hyperbolic summation, Ramanujan's formula for the Riemann zeta function evaluated at the odd positive integers, and new formulae for Euler's constant, gamma.
Comments: AMSTeX; Math Reviews MR #97a:11132
Journal: Mathematical Proceedings of the Cambridge Philosophical Society, Vol. 120 (October 1996), no. 3, pp. 391--401. MR1388195 (97a:11132)
Monotonicity properties related to the ratio of two gamma functions
Expressions for values of the gamma function
The integrals in Gradshteyn and Ryzhik. Part 4: The Gamma function
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